This paper reviews structural problem decomposition methods, such as tree and path decompositions. It is argued that these notions can be applied in two distinct ways: Either to show that a problem is efficiently solvable when a width parameter is fixed, or to prove that the unrestricted (or some width-parameter free) version of a problem is tractable by using a width-notion as a mathematical tool for directly solving the problem at hand. Examples are given for both cases. As a new showcase for the latter usage, we report some recent results on the Partner Units Problem, a form of configuration problem arising in an industrial context. We use the notion of a path decomposition to identify and solve a tractable class of instances of this pro...
We examine a decomposition approach to find good quality feasible solutions. In particular, we study...
A path-decomposition of a graph is a partition of its edges into subgraphs each of which is a path o...
This work was also published as a Rice University thesis/dissertation: http://hdl.handle.net/1911/19...
This paper reviews structural problem decomposition methods, such as tree and path decompositions. I...
This paper reviews structural problem decomposition methods, such as tree and path decompositions. I...
The chapter covers methods for identifying islands of tractability for NP-hard combi-natorial proble...
In this paper we derive a generic form of structural decomposition for the constraint satisfaction p...
AbstractIn this paper we derive a generic form of structural decomposition for the constraint satisf...
Many NP-hard problems on graphs are known to be tractable if we restrict the input to have a certain...
The general intractability of the constraint satisfaction problem has motivated the study of restric...
In this paper we derive a generic form of structural decomposition for the constraint satisfaction p...
In this talk (draft paper) we develop the theory of structural decompositions for the CSP. We begin...
The focus of this thesis is the concept of tree-decomposition. A tree-decomposition of a graph G is ...
Motivated by the desire to speed up dynamic programming algorithms for graphs of bounded treewidth,...
AbstractWe compare tractable classes of constraint satisfaction problems (CSPs). We first give a uni...
We examine a decomposition approach to find good quality feasible solutions. In particular, we study...
A path-decomposition of a graph is a partition of its edges into subgraphs each of which is a path o...
This work was also published as a Rice University thesis/dissertation: http://hdl.handle.net/1911/19...
This paper reviews structural problem decomposition methods, such as tree and path decompositions. I...
This paper reviews structural problem decomposition methods, such as tree and path decompositions. I...
The chapter covers methods for identifying islands of tractability for NP-hard combi-natorial proble...
In this paper we derive a generic form of structural decomposition for the constraint satisfaction p...
AbstractIn this paper we derive a generic form of structural decomposition for the constraint satisf...
Many NP-hard problems on graphs are known to be tractable if we restrict the input to have a certain...
The general intractability of the constraint satisfaction problem has motivated the study of restric...
In this paper we derive a generic form of structural decomposition for the constraint satisfaction p...
In this talk (draft paper) we develop the theory of structural decompositions for the CSP. We begin...
The focus of this thesis is the concept of tree-decomposition. A tree-decomposition of a graph G is ...
Motivated by the desire to speed up dynamic programming algorithms for graphs of bounded treewidth,...
AbstractWe compare tractable classes of constraint satisfaction problems (CSPs). We first give a uni...
We examine a decomposition approach to find good quality feasible solutions. In particular, we study...
A path-decomposition of a graph is a partition of its edges into subgraphs each of which is a path o...
This work was also published as a Rice University thesis/dissertation: http://hdl.handle.net/1911/19...